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Browse All Reviews > Mathematics Of Computing (G) > Numerical Analysis (G.1) > Quadrature And Numerical Differentiation (G.1.4) > Gaussian Quadrature (G.1.4...)
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1-6 of 6
Reviews about "Gaussian Quadrature (G.1.4...)":
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History of “Gaussian” elimination Joseph Grcar. YouTube, 01:24:37, published on Feb 6, 2015, ICMEStudio, https://www.youtube.com/watch?v=KxmmYve4AX0. Type: Video
The first interesting fact made clear in this talk is that Gaussian elimination, as we know it today, has its origins so far back in time that certainly in the beginning it was neither “Gaussian” nor “elim...
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Jul 22 2016 |
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Exact equation of the boundary of unimodal and bimodal domains of a two-component Gaussian mixture Aprausheva N., Sorokin S. Pattern Recognition and Image Analysis 23(3): 341-347, 2013. Type: Article
The issue addressed in this paper concerns the common necessary and sufficient conditions needed for unimodality and bimodality of a two-component Gaussian mixture having equal variances. The authors demonstrate that the generalized so...
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Feb 12 2014 |
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Small deviations for two classes of Gaussian stationary processes and Lp-functionals, 0 < p ≤ ∞ Fatalov V. Problems of Information Transmission 46(1): 62-85, 2010. Type: Article
Functional quantization in information theory creates stimulating questions: How should sharp asymptotes for quantization errors of a large class of Gaussian measures on a Hilbert space be derived? How should high-resolution theory of ...
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Nov 22 2010 |
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Suitable Gauss and Filon-type methods for oscillatory integrals with an algebraic singularity Hascelik A. Applied Numerical Mathematics 59(1): 101-118, 2009. Type: Article
The problem of the numerical computation of integrals has been investigated for many centuries, yet there are still some cases for which no satisfactory results are known....
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Apr 9 2009 |
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Construction of generalized Gauss-Jacobi quadratures by means of computer algebra methods Bogolubsky A., Skorokhodov S. Programming and Computing Software 31(2): 103-109, 2005. Type: Article
Gauss-type quadrature formulas are extremely useful, efficient, and accurate methods for the numerical computation of many types of weighted integrals. However, the computation of such formulas (namely, of their weights and nodes) in c...
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Mar 28 2006 |
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An algorithm for generating interpolatory quadrature rules of the highest degree of precision with preassigned nodes for general weight functions Patterson T. ACM Transactions on Mathematical Software 15(2): 123-136, 1989. Type: Article
This paper describes an algorithm for computing quadrature rules with preassigned nodes. These new rules, which may be regarded as extensions of some given rule, are often used to obtain error estimates for the given rule. The new rule...
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Jun 1 1990 |
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